Download AP Physics C: Mechanics 2016 Free

AP Physics C: Mechanics
2016 Free-Response Questions
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ADVANCED PLACEMENT PHYSICS C TABLE OF INFORMATION
CONSTANTS AND CONVERSION FACTORS
Proton mass, m p
1.67 – 10 27 kg
Neutron mass, mn
1.67 – 10 27 kg
Electron mass, me
9.11 – 10 31 kg
6.02 – 10 23 mol 1
Avogadro’s number, N 0
R
Universal gas constant,
8.31 J (mol <K)
1.60 – 10 19 C
1 electron volt, 1 eV
1.60 – 10 19 J
Speed of light,
Universal gravitational
constant,
Acceleration due to gravity
at Earth’s surface,
3.00 – 108 m s
c
6.67 – 10 11 N<m 2
G
kg 2
9.8 m s2
g
1.38 – 10 23 J K
Boltzmann’s constant, k B
1 unified atomic mass unit,
1u
1.66 – 10 27 kg
931 MeV c 2
Planck’s constant,
h
6.63 – 10 34 J <s
4.14 – 10 15 eV <s
hc
1.99 – 10 25 J <m
1.24 – 103 eV < nm
e0
8.85 – 10 12 C2 N < m 2
Vacuum permittivity,
1 4 pe0 Coulomb’s law constant, k
m0
Vacuum permeability,
m0 4 p Magnetic constant, k „
1 atmosphere pressure,
UNIT
SYMBOLS
e
Electron charge magnitude,
meter,
kilogram,
second,
ampere,
kelvin,
PREFIXES
Factor
Prefix
Symbol
m
kg
s
A
K
mole,
hertz,
newton,
pascal,
joule,
1 atm
mol
Hz
N
Pa
J
9.0 – 109 N< m 2
C2
4 p – 10 7 (T <m) A
1 – 10 7 (T< m) A
1.0 – 105 N m 2
watt,
coulomb,
volt,
ohm,
henry,
W
C
V
W
H
1.0 – 105 Pa
farad,
tesla,
degree Celsius,
electron volt,
F
T
’C
eV
VALUES OF TRIGONOMETRIC FUNCTIONS FOR COMMON ANGLES
D
q
0
30D
37D
45D
53D
60D
90D
109
giga
G
sin q
0
12
35
2 2
45
3 2
1
106
mega
M
cos q
1
3 2
45
2 2
35
12
0
103
kilo
k
tan q
0
3 3
34
1
43
3
‡
10 2
centi
c
10 3
milli
m
6
micro
m
10 9
nano
n
10 12
pico
p
10
The following assumptions are used in this exam.
I. The frame of reference of any problem is inertial unless otherwise
stated.
II. The direction of current is the direction in which positive charges
would drift.
III. The electric potential is zero at an infinite distance from an isolated
point charge.
IV. All batteries and meters are ideal unless otherwise stated.
V. Edge effects for the electric field of a parallel plate capacitor are
negligible unless otherwise stated.
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ADVANCED PLACEMENT PHYSICS C EQUATIONS
MECHANICS
Ãx
Ãx 0 a x t
x
x0 Ãx 0 t Ãx2

a

F

J

p
1 2
at
2 x
Ãx 0 2 a x x x0 2

Fnet
m

ÇF
m

dp
dt

Ô F dt

Dp

mv


F f … m FN
 
Ô F dr
DE
W
K
1 2
mÃ
2
P
P
dE
dt
 
F v
DUg
ac

t

a
I
mg Dh
Ã2
r
Us
 
r–F

Çt
I
x

t net
I
2
Ô r dm
Ç mr
Ã
rw

L
 
r – p
1 2
Iw
2
w0 at
q
q0 w0 t 1
2
k Dx 2
xmax cos( wt f

FE

E

FE
q
Ex
DV
V
Q
e0
dV
dx
 
Ô E dr
DV
Q
C
1 q1q2
4pe0 r
C
k e0 A
d
Cp
Ç Ci
1
Cs
ÇC
i
1
i
i
m
k

E
Tp

2p
g
I
I
1
f
R

FG
Gm1m2
r2
Gm1m2
r
Rs
1
Rp
P
-3-
P
Q
q
R
r
t
U
=
=
=
=
=
=
=
V=
v =
r =
F =
k =

FM

area
magnetic field
capacitance
distance
electric field
emf
force
current
current density
inductance
length
number of loops of wire
per unit length
number of charge carriers
per unit volume
power
charge
point charge
resistance
radius or distance
time
potential or stored energy
electric potential
velocity or speed
resistivity
flux
dielectric constant
 
qv – B

Ô B  d 
dQ
dt
2p
2p
w
UC
=
=
=
=
=
=
=
=
=
=
=
=
N =
q
Ç rii
i
1
4pe0
qV
I
F
I
J
L

n
UE
A
B
C
d
E
ε
Ts
UG
1 2
at
2
1 q1q2
4pe0 r 2
 
Ô E  dA
2

Iw
w
acceleration
energy
force
frequency
height
rotational inertia
impulse
kinetic energy
spring constant
length
angular momentum
mass
power
momentum
radius or distance
period
time
potential energy
velocity or speed
work done on a system
position
coefficient of friction
angle
torque
angular speed
angular acceleration
phase angle

k D x
1
QDV
2
r
A

rJ
T
Ç mi xi
Ç mi
xcm
K
w2r
a =
E=
F =
f =
h =
I =
J =
K =
k =
 =
L =
m=
P =
p =
r =
T =
t =
U=
v =
W=
x =
m =
q =
t =
w =
a =
f =

Fs
ELECTRICITY AND MAGNETISM
1
C DV 2
2

dB

F
m0 I

m0 I d  – r
4p r 2
 
Ô I d – B
Bs
m0 nI
Nevd A
FB
Ô B  dA
DV
R
e
Ô E  d 
e
L
Ç Ri
i
1
ÇR
i
I DV
i
UL




dI
dt
1 2
LI
2
d FB
dt
ADVANCED PLACEMENT PHYSICS C EQUATIONS
GEOMETRY AND TRIGONOMETRY
Rectangle
A bh
1
bh
2
Circle
A
pr2
C
2p r
s rq
Rectangular Solid
V wh
Cylinder
V
pr 
S
2p r  2p r
df
dx
A = area
C = circumference
V = volume
S = surface area
b = base
h = height
 = length
w = width
r = radius
s = arc length
q = angle
Triangle
A
CALCULUS
S
d ax
e dx
aeax
q
2
a cos ax d
>cos ax @
dx
a sin ax Ôe
n
dx
ax
dx
dx
Ôxa
4 3
pr
3
4p r
2
a 2 b2
1
x
d
>sin ax @
dx
Ôx
r
Right Triangle
1 n 1
x , n › 1
n 1
1 ax
e
a
ln x a
Ô cos ax dx
1
sin ax a
Ô sin ax dx
1
cos ax a
c2
sin q
a
c
cos q
b
c
tan q
nx n 1
d
ln ax dx
Sphere
V
d n
x dx
s
2
d f du
du dx
a
b
c
q
VECTOR PRODUCTS
 
A B AB cos q
 
A–B
AB sin q
a
90°
b
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2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
PHYSICS C: MECHANICS
SECTION II
Time—45 minutes
3 Questions
Directions: Answer all three questions. The suggested time is about 15 minutes for answering each of the questions,
which are worth 15 points each. The parts within a question may not have equal weight. Show all your work in this
booklet in the spaces provided after each part.
Mech.1.
A cart of mass m is pulled along a level dynamics track as shown above. A force sensor is attached to the cart
with a string and used to measure the horizontal force exerted on the cart to the right. A motion sensor is used
to measure the acceleration of the cart with the positive direction toward the right. Friction is not negligible.
(a) On the dot below, which represents the cart, draw and label the forces (not components) that act on the cart.
Each force must be represented by a distinct arrow starting on, and pointing away from, the dot.
A student pulls the force sensor with a constant force, and the cart accelerates. This is repeated for several trials,
with a different constant force used for each trial. The data are recorded in the table below.
Trial
1
2
3
4
5
Force sensor reading (N)
0.32
0.38
0.44
0.50
0.60
0.12
0.22
0.33
0.50
0.70
Acceleration m s2
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2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
(b)
i. On the grid below, plot data points for the acceleration of the cart as a function of the force sensor
reading. Clearly scale all axes. Draw a straight line that best represents the data.
ii. Using the straight line from the graph, calculate the mass of the cart.
iii. Using the straight line from the graph, determine the magnitude of the force of friction.
The above experiment is repeated by using a constant force sensor reading of 0.45 N. The cart starts from rest
at time t = 0 s and is pulled for a time of 2.0 s along the dynamics track.
(c)
i. Determine the acceleration of the cart.
ii. The string breaks at time t = 2.0 s. Calculate the time it takes for the cart to stop after the string breaks.
The experiment and analysis in parts (a) and (b) are repeated with a cart that has the same mass but a greater
force of friction.
(d)
i. Will the slope of your new line be greater than, less than, or equal to the slope of your line in
part (b)i?
____ Greater than
____ Less than
____ Equal to
ii. Will the horizontal intercept of your new line be greater than, less than, or equal to the horizontal
intercept of your line in part (b)i?
____ Greater than
____ Less than
____ Equal to
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2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
Mech.2.
A block of mass 2M rests on a horizontal, frictionless table and is attached to a relaxed spring, as shown in the
figure above. The spring is nonlinear and exerts a force F x Bx 3 , where B is a positive constant and x is
the displacement from equilibrium for the spring. A block of mass 3M and initial speed v0 is moving to the left
as shown.
(a) On the dots below, which represent the blocks of mass 2M and 3M, draw and label the forces (not
components) that act on each block before they collide. Each force must be represented by a distinct arrow
starting on, and pointing away from, the appropriate dot.
The two blocks collide and stick to each other. The two-block system then compresses the spring a maximum
distance D, as shown above. Express your answers to parts (b), (c), and (d) in terms of M, B, v0 , and physical
constants, as appropriate.
(b) Derive an expression for the speed of the blocks immediately after the collision.
(c) Determine an expression for the kinetic energy of the two-block system immediately after the collision.
(d) Derive an expression for the maximum distance D that the spring is compressed.
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-7-
2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
(e)
i. In which direction is the net force, if any, on the block of mass 2M when the spring is at maximum
compression?
____ Left
____ Right
____ The net force on the block of mass 2M is zero.
Justify your answer.
ii. Which of the following correctly describes the magnitude of the net force on each of the two blocks
when the spring is at maximum compression?
____ The magnitude of the net force is greater on the block of mass 2M.
____ The magnitude of the net force is greater on the block of mass 3M.
____ The magnitude of the net force on each block has the same nonzero value.
____ The magnitude of the net force on each block is zero.
Justify your answer.
(f) Do the two blocks, which remain stuck together and attached to the spring, exhibit simple harmonic motion
after the collision?
____ Yes
____ No
Justify your answer.
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2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
Mech.3.
A uniform rod of length d has one end fixed to the central axis of a horizontal, frictionless circular platform of
radius R 2 d . Fixed at the other end of the rod is an ideal spring of negligible mass to which a block is
attached. The block is set in frictionless grooves so that it can only move along a radius of the platform, as
shown in Figure 1 above. The equilibrium length of the spring is d 2 . Below is a table showing the mass of the
block and the masses and rotational inertias of the rod and platform.
Block
Mass
m
Rotational Inertia
Rod
mR
3m
mR d 2
(about the end of the rod)
3
Platform
mP
5m
mP R 2
(about the central axis)
2
A motor begins to slowly rotate the platform counterclockwise as viewed from above until the platform reaches
a constant angular speed ω . Under these conditions, the spring has stretched by an additional length d 2 , as
shown in Figure 2.
Answer the following questions for the platform rotating at constant angular speed ω . Express all algebraic
answers in terms of m, d, ω , and physical constants, as appropriate.
(a) Derive an expression for the spring constant of the spring.
(b)
i. Determine an expression for the rotational inertia of the block around the axis of the platform.
ii. Derive an expression for the rotational inertia of the entire system about the axis of the platform.
(c) Determine an expression for the angular momentum of the entire system about the axis of the platform.
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-9-
2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
While the system continues to rotate, a small mechanism in the pivot moves the rod slowly until the center of the
rod is positioned on the axis, as shown in Figure 3 above. The same constant angular speed ω is maintained by
the motor driving the platform.
(d) Derive an expression for the distance x that the spring is stretched when the rod reaches the position shown
in Figure 3 above.
For parts (e), (f), and (g), assume the center of the rod is still moving toward the axis of the platform.
(e) Is the angular momentum of the entire system increasing, decreasing, or staying the same?
_____ Increasing
_____ Decreasing
_____ Staying the same
Justify your answer.
(f) In order to keep the system rotating with constant angular speed ω , is the motor doing positive work,
negative work, or no work on the rotating system?
_____ Positive
_____ Negative
_____ No work
Justify your answer.
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-10-
2016 AP® PHYSICS C: MECHANICS FREE-RESPONSE QUESTIONS
(g) On the block in Figure 4 below, draw a single vector representing the direction of the acceleration
of the block. Draw the vector so that it is starting on, and pointing away from, the block.
STOP
END OF EXAM
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